The generalized 3-connectivity of the folded hypercube FQn

Abstract

The generalized k-connectivity of a graph G, denoted by k(G), is a generalization of the traditional connectivity. It is well known that the generalized k-connectivity is an important indicator for measuring the fault tolerance and reliability of interconnection networks. The n-dimensional folded hypercube FQn is obtained from the n-dimensional hypercube Qn by adding an edge between any pair of vertices with complementary addresses. In this paper, we show that 3(FQn)=n for n 2, that is, for any three vertices in FQn, there exist n internally disjoint trees connecting them.